Difference between revisions of "CxLL"
m (clean up) |
m (→Navigator: clean up) |
||
Line 54: | Line 54: | ||
[[Category:Methods]] | [[Category:Methods]] | ||
[[Category:2x2x2 methods]] | [[Category:2x2x2 methods]] | ||
− | [[Category:3x3x3 | + | [[Category:3x3x3 methods]] |
[[Category:Last Layer Methods]] | [[Category:Last Layer Methods]] | ||
[[Category:Algorithms]] | [[Category:Algorithms]] | ||
[[Category:Sub Steps]] | [[Category:Sub Steps]] |
Revision as of 19:04, 19 May 2012
Corners Last Layer is a group of methods collectively known as C*LL or CxLL that solve the last layer corners in one algorithm. Each method has certain restrictions that apply, and each can affect other pieces in different ways. For example, CMLL allows movement of the M layer and allows destruction of the UL and UR edges. Two other common sets of algorithms include CLL and COLL. These differ from the fact that the latter preserves last layer's edges orientation while the former does not necessarily. In some cases, CLL will give shorter algorithms due to lack of restrictions.
C*LL is useful for the 2x2x2, which has no edges, and also for corners first, which solves edges after the corners. C*LL is also used in Roux's method, and is specifically known as CMLL. It is of course also useful after a normal F2L is completed, COLL often together with the Petrus method or in the Fridrich variation, with a preceeding VH or ZB F2L. CLL for 3x3 solves the LL corners before anything is done to the edges, that then are solved using ELL (the Guus method), probably the most effective way (that is used) to solve a completly scrambled LL in two steps.
Contents
The lists
Browse
At bottom of each page there is a navigator that you use to browse from page to page by clicking the names under the thumbnail images.
Case Descriptions
There are 2 tables for case descriptions. The first is the positional recognition system and the second is the hyperorientation recognition system.
Positional System:
Hyperorientation System:
All color patterns show the orientation case in white. The blue and green stickers show the position of opposite color stickers (red/orange, blue/green, white/yellow on the standard scheme). |
In case descriptions there are sometimes links to the "inverse case", that is the case you get if you do N-PLL on the case you got (or faster R2 F2 R2).
The Algorithms
In each page there is a list of algorithms for different CxLL based methods: topmost is COLL, followed by CLL, CMLL etc. An algorithm suitable for COLL preserves the edge orientation. If not, it is a CLL algorithm. If the algorithm changes the M slice then it is a CMLL. If it changes F2L edges it is a Corners First/2x2x2 algorithm and if it changes FL corner permutation it is a EG 0/1 alg (all levels are also useful for Ortega). CLLEF acts in the same way as COLL, except that it flips 4 edges (to be used with OLLs 1, 2, 3, 4, 17, 18 & 19).
Beginners
For a beginner who likes a stepping stone it is possible to do CxLL in two steps; first orientation and then permutation. In the navigator these algs are the grey cases having single letter names, orientations are in the leftmost row and permutations in the topmost line.
See also
- CO
- CLL, CLL algorithms (3x3x3)
- COLL
- COLL Algorithm Database
- CMLL
- CLLEF
- OLLCP
- CxLL algorithms
- Last Three Corners
- Last Four Corners
External links
- Thread discussing this CxLL page
- Thread discussing 2x2x2 algorithms
- Hyperorientations: A proposed method for recognizing C*LL cases easily.
- Speedsolving.com: CxLL Recognition
CxLL edit |
U |
D |
R |
L |
F |
B |
U |
U U |
U D |
U R |
U L |
U F |
U B |
T |
T U |
T D |
T R |
T L |
T F |
T B |
L |
L U |
L D |
L R |
L L |
L F |
L B |
S |
S U |
S D |
S R |
S L |
S F |
S B |
-S |
-S U |
-S D |
-S R |
-S L |
-S F |
-S B |
Pi |
Pi U |
Pi D |
Pi R |
Pi L |
Pi F |
Pi B |
H |
H U |
H D |
H R |
H L |
H F |
H B |
Hyper CLL edit |
U |
D |
R |
L |
F |
B |
U |
U U |
U D |
U R |
U L |
U F |
U B |
T |
T U |
T D |
T R |
T L |
T F |
T B |
L |
L U |
L D |
L R |
L L |
L F |
L B |
S |
S U |
S D |
S R |
S L |
S F |
S B |
-S |
-S U |
-S D |
-S R |
-S L |
-S F |
-S B |
Pi |
Pi U |
Pi D |
Pi R |
Pi L |
Pi F |
Pi B |
H |
H U |
H D |
H R |
H L |
H F |
H B |